Some notes on endpoint estimates for pseudo-differential operators

Abstract

We study the pseudo-differential operator equation* Ta f(x)=∫Rneix·a(x,)f()\,d, equation* where the symbol a is in the H\"ormander class Sm,1 or more generally in the rough H\"ormander class L∞Sm with m∈R and ∈ [0,1]. It is known that Ta is bounded on L1(Rn) for m<n(-1). In this paper we mainly investigate its boundedness properties when m is equal to the critical index n(-1). For any 0≤ ≤ 1 we construct a symbol a∈ Sn(-1),1 such that Ta is unbounded on L1 and furthermore it is not of weak type (1,1) if =0. On the other hand we prove that Ta is bounded from H1 to L1 if 0≤ <1 and construct a symbol a∈ S01,1 such that Ta is unbounded from H1 to L1. Finally, as a complement, for any 1<p<∞ we give an example a∈ S-1/p0,1 such that Ta is unbounded on Lp(R).